System and method for monitoring the handling of a vehicle

ABSTRACT

A system for monitoring the handling of a vehicle has a plurality of individual systems ( 12, 14, 16 ) for influencing the handling of the vehicle, a management device ( 10 ) being provided for managing the influence on the handling by the individual systems ( 12, 14, 16 ). A method for monitoring a handling of a vehicle is also described.

[0001] The present invention relates to a system for monitoring the handling of a vehicle, having a plurality of individual systems for influencing the handling of the vehicle. The present invention relates furthermore to a method of monitoring the handling of a vehicle using a plurality of individual systems.

BACKGROUND INFORMATION

[0002] Systems and methods according to the definition of the species are used in particular for stabilizing the handling of motor vehicles. A plurality of different systems exist, which operate on the basis of different measured variables and by influencing different parameters which act upon the handling of the vehicle. Examples of such systems, also known as vehicle dynamics controls, include the Electronic Stability Program (ESP), Active Body Control (ABC), chassis control with superimposed stabilizing intervention (EAR), front axle steering with superimposed stabilizing intervention (EAS) or rear axle steering.

[0003] Since a plurality of these individual systems may be installed in the same vehicle, it is possible that effects of the stabilizing interventions of the individual systems become superimposed, creating the typical problem of multiple-variable control. The interventions of the different individual systems may be superimposed additively and thus result in an excessive total intervention; in other words: a plurality of redundant interventions occur. It is also possible that a subtractive superimposition takes place, so that ultimately an excessively weak intervention in the vehicle stability occurs. Additive superimposition of the intervention results mainly in undesirable impairment of driving comfort. In the event of subtractive superimposition of the interventions, there is insufficient vehicle dynamics control, which represents a driving safety problem in particular.

[0004] In order to suppress interference of the control measures taken by the individual systems, it has been proposed that specific signals be exchanged between the individual systems or the critical function areas in the individual systems be suppressed. In this way the systems may be made to coexist and their actions not to affect one another negatively. The total benefit of the combined system may thus remain as great as the sum of the benefits of the individual subsystems.

ADVANTAGES OF THE INVENTION

[0005] The present invention builds on the system according to the definition of the species by providing a management device for managing the influence on the handling by the individual systems. By managing the stabilization functions of the individual functions in a targeted manner, it is possible that the total benefit is greater than the sum of the individual benefits. This may take place by the management device influencing the effects of the individual systems as a function of the situation. Thus, vehicle stability with maximum driving comfort and minimum loss of speed may be maintained. In this manner, the individual systems may act fully independently in principle; this means that, without intervention by the management device, the effects of the individual systems are independent of one another. The management device does not intervene until the individual systems might exert an undesirable influence on one another. In this context, it is considered advantageous in particular that in the event of a failure of the management device, it may be ensured that the individual systems continue to deploy their vehicle stabilizing actions, which is particularly useful from the point of view of driving safety. The subsystems may also be developed and calibrated separately.

[0006] In particularly preferred systems, ESP, EAS, EAR and/or ABC may be provided as individual systems. These individual systems are mentioned as examples, without restricting the generality of the present invention, which may contain any desired individual systems.

[0007] In a particularly preferred embodiment, the system is refined by the fact that the management device is implemented in a control unit which communicates with control units of the individual systems via an interface. Such an interface may be implemented, for example, within a CAN system. The management device may receive information via CAN or another interface about the activity of the individual systems. This information may be formulated either directly as an effective moment about the vertical axis acting upon the vehicle's center of gravity or a force acting upon the vehicle's center of gravity. It may also be represented as an mediator variable, which is converted in the management device to a moment basis. Conversely, the control units of the individual systems may receive information from the management device via the interface, i.e., via CAN, for example, so that the actions of the individual systems are influenced.

[0008] In a preferred embodiment, the management device is implemented in a separate control unit. The management device is thus independent of the control devices of the individual systems in terms of the hardware. The systems may therefore be developed and calibrated independently of one another.

[0009] The management device may also be implemented in one or more control unit(s) of the individual systems. The control units of the individual systems are hardware components, which are available anyway. Thus the hardware cost may be reduced by implementing the management device within these control units of the individual systems.

[0010] In a particularly preferred embodiment of the method according to the present invention, it is refined by the fact that setpoint values determined by the individual systems and actual values are input into the management device; the potential effects of the individual systems are determined from the input values, and the management device may output values which influence the effects of individual systems. The management device thus acts preventively on any undesirable interventions. The setpoint values determined by the individual systems are detected by the management device and, taking into account the actual values associated with the respective variables, are adjusted to one another. Thus the management device may output values so that the effects of the individual systems are adjusted as needed.

[0011] In this context, it is considered particularly advantageous that the management device may suppress interventions by individual systems. In this variant, the individual systems operate completely independently of one another when no intervention by the management device takes place. This is advantageous, for example, in the event of a failure of the management device. The individual systems are in this case still fully functional. Only when interventions by individual systems are to be suppressed does the management device takes action. In this case, for example, the transmission of an acknowledge signal indicating whether the stabilizing intervention proposed by the individual system is to be suppressed may be sufficient. For example, a symbolic digital 1 may be used for suppression, and a symbolic digital 0 or no signal transmission may be used for full implementation of the stabilizing intervention.

[0012] The present invention builds on the generic method in that a management device is provided for managing the influence on the handling by the individual systems. In this way, the advantages of the system according to the present invention are implemented in the method. In the embodiments of the method described in the following, the advantages and particular features of the respective system embodiments are also noted.

[0013] In particularly advantageous methods, ESP, EAS, EAR and/or ABC may be provided as individual systems. In a particularly preferred embodiment, the method is refined by the fact that the management device is implemented in a control unit which communicates with control units of the individual systems via an interface.

[0014] In a preferred embodiment, the management device is implemented in a separate control unit. However, it may of course also be useful to implement the management device in one or more control unit(s) of the individual systems.

[0015] In a particularly preferred embodiment of the method according to the present invention, it is refined by the fact that setpoint values determined by the individual systems and actual values are input into the management device; the potential effects of the individual systems are determined from the input values, and the management device may output values which influence the effects of individual systems.

[0016] In this context, it is considered particularly advantageous that the management device may suppress interventions by the individual systems.

[0017] The present invention is based on the principle that the total benefits of the systems may be greater than the sum of the individual benefits due to the targeted management of the individual systems' stabilization functions. This may occur, for example, by suppressing interfering interventions as a function of the situation, while specific required interventions are jointly allowed. The subsystems may be developed and calibrated independently from one another; only the possibility of information exchange must be ensured. Any desired configuration levels may also be implemented within a vehicle's range of options. Attention must be paid to the correct handling of interfaces in all control units involved. Thus, the development and calibration of the management device is essential for the joint operation of all individual systems in the vehicle.

DRAWINGS

[0018] The invention is elucidated in the following with reference to preferred exemplary embodiments illustrated in the drawing.

[0019]FIG. 1 shows a block diagram illustrating a system according to the present invention;

[0020]FIG. 2 shows a block diagram illustrating a vehicle stability management system;

[0021]FIG. 3 shows a μ-slip curve for a tire model in the longitudinal direction of the tire;

[0022]FIG. 4 shows a μ-slip curve for a tire model in the transverse direction of the tire;

[0023]FIG. 5 shows a diagram for elucidating the angular relationships of the tire forces;

[0024]FIG. 6 shows a flow chart for elucidating a tire force computation for forces applied bidirectionally;

[0025]FIG. 7 shows a flow chart for elucidating the computation of a tire force and a change in tire force in an ESP longitudinal force intervention;

[0026]FIG. 8 shows a flow chart for elucidating the computation of a tire force and a change in tire force in an EAS lateral force intervention;

[0027]FIG. 9 shows a diagram for elucidating a vehicle model for computing the moments about the vertical axis acting on the vehicle's center of gravity;

[0028]FIG. 10 shows a flow chart for elucidating the computation of moments about the vertical axis acting on the vehicle's center of gravity;

[0029]FIG. 11 shows a flow chart for elucidating the computation of a moment acting on the center of gravity by summation;

[0030]FIG. 12 shows a flow chart for elucidating the computation of a moment acting on the center of gravity by summation in ESP longitudinal force intervention;

[0031]FIG. 13 shows a flow chart for elucidating the computation of a moment acting on the center of gravity by summation in EAS lateral force intervention;

[0032]FIG. 14 shows a flow chart for elucidating the formation of intervention moments in ESP and EAS for an intervention evaluation; and

[0033]FIG. 15 shows a flow chart for elucidating the prioritization, evaluation, and selection of stabilizing interventions.

DESCRIPTION OF THE EXEMPLARY EMBODIMENTS

[0034]FIG. 1 shows a block diagram illustrating a system according to the present invention. The block diagram shows functional units and arrows symbolizing signals between the individual functional units. Individual signals are symbolized by arrows having a single line. Signal vectors are symbolized by arrows having more than one line. Three individual systems 12, 14, 16 are shown as examples. An ESP control unit 12, an EAS control unit 14, and an EAR control unit 16 each communicate with a vehicle stability management control unit 10 via CAN 18 according to a valid protocol convention. Vehicle stability management control unit 10 is illustrated here as a separate control unit. Another option is to add the additional load of the functions of vehicle stability management control unit 10 to one of the existing control units 12, 14, 16. Control units 12, 14, 16 of the individual units transmit information to vehicle stability management control unit 10, i.e., values having an influence on the intended interventions in the vehicle dynamics in particular. Vehicle stability management control unit 10 in turn transmits values to control units 12, 14, 16 of the individual systems, for example, a 0 for enabling the action of control units 12, 14, 16 of the individual systems and a 1 for blocking those actions. These actions may include, for example, influencing a brake system 20, a steering system 22, or a chassis 24 via appropriate actuators 26.

[0035]FIG. 2 shows a block diagram illustrating a vehicle stability management system. The block diagram shows functional units and arrows symbolizing signals between the individual functional units. Individual signals are symbolized by arrows having a single line. Signal vectors are symbolized by arrows having more than one line. Various values are transmitted to the vehicle stability management system via input 28 of a CAN interface. These values include, for example, a stabilizing setpoint wheel slip by ESP 40 and a superimposed steering angle on the front axle for stabilizing by EAS 42. Furthermore, information is transmitted by subsystems 44. This may include in particular the following variables: slip per wheel, vehicle speed, transverse acceleration, driver steering angle, steering angle on the wheel, accelerator pedal position, driver braking pressure, slip angle of the front and/or rear axles, wheel contact forces, and coefficient of friction.

[0036] A differential moment about the vertical axis acting on the vehicle's center of gravity generated by a stabilizing chassis intervention of EAR 46 is transmitted as an additional variable via input 28 of the CAN interface.

[0037] Information 40, 42, 44 is transmitted to a unit 32 for computing the longitudinal and transverse forces acting on the vehicle tires and the changes in those forces from physical models of the tire characteristic. Information regarding the longitudinal forces acting on the tires and the changes in those forces due to longitudinal force intervention 48 and regarding the transverse forces acting on the tires and the changes in those forces due to lateral force intervention 50 results from the computation in unit 32. Information 48 is transmitted to a unit 34 for computing moments about the vertical axis acting on the vehicle's center of gravity and changes in those moments due to an ESP intervention. Information 50 is transmitted to a unit 36 for computing moments about the vertical axis acting on the vehicle's center of gravity and changes in those moments due to an EAS intervention. The output variable of unit 34 is a differential moment about the vertical axis acting on the vehicle's center of gravity by a stabilizing braking intervention 52. The output variable of unit 36 is a differential moment about the vertical axis acting on the vehicle's center of gravity by a stabilizing front axle steering intervention 54. The latter information 52, 54 is transmitted to a unit for prioritizing, evaluating, and selecting stabilizing interventions 38. The output variables of unit 38 are instructions for suppressing a longitudinal force intervention 56, a lateral force intervention 58, and/or a normal force intervention 60, which are output as a function of the results of unit 38 via the output of CAN interface 30.

[0038] The differential moment about the vertical axis acting on the vehicle's center of gravity due to a stabilizing chassis intervention by EAR 46 is transmitted directly to unit 38 for prioritizing, evaluating, and selecting stabilizing interventions and are taken into account by unit 38.

[0039] In summary, in the unit according to FIG. 2, the incoming signals, possibly converted to a moment about the vertical axis acting on the vehicle's center of gravity, are interpreted as a vehicle stabilizing intervention, added up, weighted, and compared. Furthermore, the intervention(s) to be suppressed is (are) selected and fed back. For example, in the illustration according to FIG. 2, it is assumed that ESP transmits the superimposed setpoint slip for each wheel as a characterizing variable of the vehicle stability intervention. Additional or other variables are conceivable and possible. For the EAS, it was assumed that the superimposed steering angle, which should act to stabilize the vehicle, is used as a transmitted variable. Additional or other variables are conceivable and possible. For the EAR it was assumed that the stabilizing moment about the vertical axis acting on the vehicle's center of gravity was directly determined in the EAR control unit on the basis of the desired and/or planned confirmation of the EAR actuator system and transmitted and is thus directly available to the vehicle management control unit. Also in this case additional or other variables are conceivable and possible.

[0040]FIG. 3 shows a μ-slip curve for a tire model in the longitudinal direction of the tire. Simplified tire characteristic curves in the longitudinal direction and a conceivable approximation as a function of the longitudinal tire slip and the coefficient of friction of the road surface are shown, the parameters set and these characteristic curves being used as examples for a plurality of possible implementations of the relationship between longitudinal tire force, longitudinal tire slip, and road surface coefficient of friction. Longitudinal wheel force μ is plotted on the vertical axis; μ is defined as

μ=F_(L/wheel)/F_(Nwheel)

[0041] i.e., longitudinal wheel force divided by the normal wheel force. Slip S1 is plotted on the vertical axis. The following equations are used to approximate the longitudinal forces:

μ={square root}{square root over ((a _(x) ² a _(y) ²)/g)}

[0042] where g=9.81 M/s²;

[0043] a_(x), a_(y): acceleration in the longitudinal and transverse directions, respectively.

[0044] Since no signals for the above computation of the coefficient of friction are available in acceleration-free travel in the longitudinal and transverse directions, a coefficient of friction μ=0.0 is specified in this case. In order to avoid problems with such zero values, the range of values of the coefficient of friction is limited to μ_(min)=0.1 μ_(max)=1.0 may be used, for example, as the upper limit value. A higher limit value would also be conceivable.

[0045] The characteristic values for the approximation of the longitudinal forces are calculated as follows, K1′ denoting a force gradient, and the given numerical values being preferably settable.

S1′(μ)=0.04+0.08*μ

K1′(μ)=1.00+12.0*μ

S1″=0.70%.

[0046] The actual approximation of the longitudinal forces using S1 as input information is then done for S1<S1′(μ) according to the equation:

F _(L) =F _(n) *K1′(μ)*S1.

[0047] Otherwise, longitudinal force FL is determined according to the following equation:

F _(L) =F _(n) *K1′(μ)*S1′*(S1′+S1″)/(S1+S1″).

[0048] The downward slope of the characteristic curve in the case of high slip S1 is taken into account by the second calculation method of F_(L).

[0049] With respect to these computations, it should be pointed out that the coefficient of friction is referred to the center of gravity of the vehicle. In this way, unequal coefficients of friction on the right and left sides of the vehicle are taken into account by averaging.

[0050]FIG. 4 shows a μ-slip curve for a tire model in the transverse direction of the tire. The lateral tire force, defined as

μ=F _(Swheel) /F _(Nwheel),

[0051] i.e., lateral wheel force divided by the normal wheel force, is plotted on the vertical axis of the diagram.

[0052] Slip angle parameter a is plotted on the right-hand axis of the diagram.

[0053] Reference is made to the discussions on FIG. 3 for determining the coefficient of friction information.

[0054] The setting parameters may be determined on the basis of the following equations, the numerical values being preferably settable in this case too:

α′,(μ)=0.80+4.00*μ

ks′(μ)=0.11+0.17*μ

α″=30°

[0055] The actual approximation then takes place according to the following equations; a distinction is to be made between two cases. In the first case, α<α′(μ). The lateral force is then computed according to the following equation:

F _(s)(μ, α)=ks′(μ)*α* F _(N).

[0056] In other cases, the lateral force is computed according to the following equation:

F _(S)(μ, α)=ks′(μ)* α′*F _(N)*(α′+a″)/(α+″)

[0057] In the second case, the drop in the lateral force for high values of a is taken into account.

[0058] For low values of a, the following approximation may also be used:

F _(S)(μ, α)=ks′(μ)*Fn*δ=ΔF _(S)(μ)*δ.

[0059] In view of the unequal coefficients of friction between the right and left sides of the vehicle, reference is again made to the discussions on FIG. 3.

[0060]FIG. 5 shows a diagram explaining the angular relationships of the tire forces. The square root of the sum of squares of longitudinal tire forces F_(L) (S1,μ, F_(N)) and F_(s) (α, μ, F_(N)) of tire 70, the first of which is determined by coefficient of friction μ and longitudinal slip S1 utilizing coefficient of friction μ, and the second by coefficient of friction μ and tire slip angle α, forms the total tire force.

F _(R)(λ, μ, F _(N))={square root}{square root over ((F _(S)(α, μ, F _(N))² +F _(L)(S1, μ, F _(N))²))}.

[0061] Assuming that the tire characteristic curves are in the linear range in the longitudinal and transverse directions, i.e., that the slip and the slip angle are small, the slip and slip angle in FIG. 5 may be plotted as shown. In this way, force angle δ may be defined from slip S1 and slip angle α_(s1) as

tan(δ)=F _(s) /F _(L)=α_(s1) /S1.

[0062] Due to the non-linearities that arise, this equation does not apply exactly for large slip and slip angle values, but is sufficiently accurate in many applications for the estimate required here.

[0063] A longitudinal vehicle force F_(L) may be estimated in this way from a predefined wheel force F_(R) as

F _(L) =F _(R) *S1/λ

[0064] and transverse tire force may be estimated as

F _(S) =F _(R)*α_(S1)/λ.

[0065] These equations may be solved relatively easily using longitudinal slip equivalent λ plotted in FIG. 5; divisions by zero must be handled in a special way.

[0066] In principle, it is possible to determine, on the basis of the tire force models explained with reference to FIGS. 4 and 5, the longitudinal force and the transverse force acting on a tire. The above-mentioned models, however, assume a unidirectional action of the forces. Superimposition in the case of bidirectional action of the forces must be handled in a special way. If one attempts to determine the longitudinal force and the transverse force separately and then to superimpose one on the other, problematic effects may arise in evaluating the forces due to the non-unambiguous correspondence between the tire forces and the slip angle, as well as between the tire forces and the slip at the maxima of the curves for medium values.

[0067] This may be avoided using the largely valid assumption of a symmetrical tire behavior in the longitudinal and transverse directions, for example, by the following procedure:

[0068] The maximum transmittable tire force is assumed to be μ*F_(N).

[0069] The square root of the sum of squares of the slip angle and the longitudinal slip form a longitudinal slip equivalent λ.

[0070] The variation of the resulting tire force results from a similar characteristic model as explained in connection with FIGS. 3 and 4.

[0071] The tire force is split into longitudinal force components and transverse force components using the angular relationships, this split being based on the slip and the slip angle.

[0072] The tire forces are approximated using the following equations. The coefficient of friction information is again formed as explained with reference to FIG. 3.

[0073] The following characteristic values are used, the numerical values being settable in this case too.

P_K_(λ)1=0.80[%]

P_K_(λ)2=4.00[%]

P_K_(λ)3=0.11[−]

P_K_(λ)4=0.17[−]

P_K_(λ)5=70.0[%]

[0074] Approximation takes place according to the following equations, broken down into two cases:

λ={square root}{square root over ((α_(S1) ² +S1²))}

λ′(μ)=P _(—) K _(λ)1+P _(—) K _(λ)2*μ

k _(λ)(μ)=P _(—) K _(λ)3+P _(—) K _(λ)4*μ

λ″=P_K_(λ)5

[0075] First Case:

λ<λ′(μ).

[0076] In this case, the lateral force is computed according to the following equation:

F _(S)(μ, λ)=ks′(μ)*λ*F _(N).

[0077] In the second case, i.e., λ≧λ′(μ), the lateral force is computed as follows:

F _(S)(μ, λ)=k _(λ)′(μ)*λ′*F _(N)*(λ′+λ″)/(λ+λ″).

[0078] In the second case, the lateral force drops at high values of longitudinal slip equivalent λ.

[0079] Conversion to the longitudinal force is then performed according to the equation

F _(L)(μ, λ, S1)=F _(S)(μ, λ)*S1/λ.

[0080] Conversion to the transverse force is performed according to

F _(L)(μ, λ, S1)=F _(S)(μ, λ)* α_(S1)/λ.

[0081] For the discussions regarding the unequal coefficients of friction between right and left vehicle sides, reference is made to FIG. 3.

[0082]FIG. 6 shows a flow chart explaining a tire force computation for forces applied bidirectionally. The meaning of the individual method steps is provided first.

[0083] 3201: Start

[0084] 3202: P_K_(λ)1=0.80 . . . [%] parameter 1 for determining the position of the maximum

[0085] P_K_(λ)2=4.00 . . . [%] parameter 2 for determining the position of the maximum

[0086] P_K_(λ)3=0.11 . . . [−] parameter 3 for determining the upward slope from the origin

[0087] P_K_(λ4=0.17) . . . [−] parameter 4 for determining the upward slope from the origin

[0088] P_K_(λ)5=70.0 . . . [%] parameter 5 for determining the downward slope for high values

[0089] P_K_(αS1)=100.0/45.0 . . . [%/°] conversion factor from slip angle to slip

[0090] 3203: α_(s1)=α*P_K_(αS1) . . . conversion of slip angle to longitudinal slip equivalent

[0091] λ=S_(QRT){α_(S1) ²+S1 ²}. . . sum of squares of slip and longitudinal slip

[0092] λ′=P_K_(λ) ₁ +P_K_(λ) ₂ *μ. . . maximum tire force, as a function of the longitudinal slip equivalent

[0093] K_(λ=P)_K_(λ) ₃ +P_K_(λ) ₄ *μ. . . tire force gradient with regard to the origin of the longitudinal slip equivalent

[0094] λ″=P_K_(λ) ₅ . . . definition of the downward slope of the tire force from max. with regard to the longitudinal slip equivalent

[0095] 3204: λ<λ′. . . longitudinal slip equivalent less than value at maximum tire force?

[0096] 3205: F_(R)=F_(N)* K_(λ)*λ′* (λ″+λ′)/(λ+λ″) . . . total tire force from -maximum with regard to the longitudinal slip equivalent

[0097] 3206: F_(R)=F_(N)* K_(λ)*λ. . . total tire force up to -maximum with regard to the longitudinal slip equivalent

[0098] 3207: λ==0 . . . longitudinal slip equivalent equal to 0.0?

[0099] 3208: F_(S) =0.0 . . . transverse tire force

[0100] F_(L)=0.0 . . . longitudinal tire force

[0101] 3209: F_(S)=F_(R)*α_(S1)/λ. . . transverse tire force

[0102] F_(L)=F_(R)*S1/λ. . . longitudinal tire force

[0103] 3210: End

[0104] After the start in step 3201, parameters for determining the tire forces are set in step 3202. In step 3203, further variables, which may be used in steps 3204 through 3210, are determined using the parameters from step 3202. In step 3204, first it is determined whether the longitudinal slip equivalent is less than the value at maximum tire force. If this is the case, in step 3206 the total tire force is computed according to the relationship given there. If this is not the case, in step 3205 another relationship given there is used for computing the total tire force. In step 3207, it is checked whether the longitudinal slip equivalent is equal to zero. If this is the case, the transverse tire force F_(S) and longitudinal tire force F_(L) are set to zero, avoiding division by zero. If this is not the case, i.e., the longitudinal slip equivalent is not equal to zero, the transverse tire force and the longitudinal tire force are computed according to the relationships given there. In step 3210, the method according to FIG. 6 is terminated.

[0105]FIG. 7 shows a flow chart explaining the computation of a tire force and a change in tire force in the case of an ESP longitudinal force intervention. In an ESP intervention, the slip angle on the front axle and on the rear axle are known but predefined variables, while the wheel slip may be influenced in order to vary the longitudinal force. The flow chart of FIG. 7 shows the computation of the instantaneous wheel forces and changes in wheel forces due to the ESP intervention. This algorithm must be run for each wheel. First the meaning of the individual steps is defined.

[0106] 3211: Start

[0107] 3212: S1=S1wheel . . . longitudinal slip of the wheel in question

[0108] 3213: α=αwheel . . . slip angle of the wheel

[0109] 3214: Call the tire force model as a function of S1, α

[0110] 3215: F_(S)wheel=F_(S) . . . store lateral force

[0111] F_(L)wheel=F_(L) . . . store longitudinal force

[0112] 3216: S1=S1+S1wheelEsp . . . longitudinal slip intervention for wheel

[0113] 3217: Call the tire force model as a function of S1, α

[0114] 3218: ΔF_(SESP)wheel=F_(S)wheel−F_(S) . . . store change in lateral force

[0115] ΔF_(LESP)wheel=F_(L)wheel−F_(L) . . . store change in longitudinal force

[0116] 3219: End

[0117] After the start of computations in step 3211, in step 3212 the longitudinal slip of a wheel in question is determined. Subsequently in step 3213, the slip angle of the wheel is determined. In step 3214, the tire force model is called as a function of parameters S1 and a which have been determined. In step 3215, the lateral force and the longitudinal force which have been determined are stored as parameters F_(S)wheel and F_(L)wheel, respectively. In step 3216, the longitudinal slip intervention for the wheel is taken into account. In step 3217, the tire force model is called again as a function of the new parameters S1 and α. In step 3218, the change in the lateral force and the change in the longitudinal force are determined by subtraction and stored. In step 3219 the computation of the tire force for the wheel in question is terminated.

[0118]FIG. 8 shows a flow chart explaining the computation of a tire force and a change in tire force in an EAS lateral force intervention. In EAS intervention, the wheel slip on the front axle and on the rear axle are known but predefined variables, while the slip angle at least on the front axle may be influenced in order to vary the lateral force. The flow chart according to FIG. 8 shows the computation of the instantaneous wheel forces and changes in wheel forces due to the EAS intervention. The slip angle interventions by the EAS are stored separately for each wheel and made equal to zero for the rear wheels. Thus the algorithm explained with reference to FIG. 8 may be run in the same way for all wheels and thus even for vehicles having an active rear axle steering and appropriate signal assignments. The algorithm explained in the following must be run for each wheel. The meaning of the method steps shown in FIG. 8 is explained first.

[0119] 3220: Start

[0120] 3221: S1=S1wheel . . . longitudinal slip of the wheel in question

[0121] 3222: α=αwheel . . . slip angle of the wheel

[0122] 3223: Call the tire force model as a function of S1, α

[0123] 3224: F_(S)wheel=F_(S) . . . store lateral force

[0124] F_(L)wheel=F_(L) . . . store longitudinal force

[0125] 3225: α=α+αwheelEas . . . longitudinal slip intervention for the wheel

[0126] 3226: Call the tire force model as a function of S1, α

[0127] 3227: ΔF_(SEAS)wheel=F_(S)wheel−F_(S) . . . store change in lateral force

[0128] ΔF_(LEAS)wheel=F_(L)wheel−F_(L) . . . store change in longitudinal force

[0129] 3228: End

[0130] In step 3220 the computation of the tire force and the change in tire force for the EAS longitudinal force intervention is initiated. In step 3221, the longitudinal slip of the wheel in question is stored as variable S1. In step 3222, the slip angle of the wheel is stored as variable a. In step 3223, the tire force model is called using the stored parameters S1 and a. In step 3224, the lateral force and the longitudinal force of the wheel are stored. Subsequently, in step 3225, a longitudinal slip intervention of the wheel is taken into account and a new variable a is stored. In step 3226, the tire force model is called again as a function of the new parameters S1 and α. Subsequently, in step 3227, a change in the lateral force is computed by subtraction and stored. A change in the longitudinal force is also computed by subtraction and then stored. In step 3228 the method shown in FIG. 8 is terminated.

[0131]FIG. 9 shows a diagram explaining a vehicle model for computing the torques about the vertical axis acting on the center of gravity of the vehicle. The symbols shown in FIG. 9 have the following meanings:

[0132] δ: steering angle; for EAS, front axle only

[0133] α_(H): tire slip angle, rear axle

[0134] α_(V): tire slip angle, front axle

[0135] ω: vehicle yaw rate

[0136] β: vehicle float angle

[0137] vFz: vehicle speed, straight-ahead

[0138] F_(Lxy): longitudinal tire force on axle x (front v/rear h) and side y (right/left)

[0139] F_(Sxy): transverse tire force on axle x (front v/rear h) and side y (right/left)

[0140] For the sake of simplicity, it is assumed that the vehicle float angle and the tire slip angle are small and thus a splitting of the forces into sine and cosine components may be omitted without major loss of accuracy. The moments are determined as follows from the longitudinal force (index L) and transverse force (index S):

[0141] M_(L)=−F_(L)*SW/2 for left wheels

[0142] M_(L)=F_(L)*SW/2 for right wheels

[0143] M_(S)=−F_(S)*1SpV for front axle

[0144] M_(S)=F_(S)*1SpH for rear axle

[0145]FIG. 10 shows a flow chart explaining the computation of moments about the vertical axis acting on the center of gravity of the vehicle. Using the calculated transverse and longitudinal forces acting on the tire and the effective lever arm, the moment acting on the center of gravity of the vehicle due to the particular wheel, as well as the change in this moment, may be determined from the changes in the forces due to the ESP and EAS interventions. The values thus determined may be added up for all wheels, which is explained with reference to FIG. 10. The meaning of the steps illustrated in FIG. 10 is explained first:

[0146] 3501: Start

[0147] 3502: wheel==VL OR wheel==VR . . . wheel is on front axle

[0148] 3503: M_(S)=F_(S)*1SpH . . . moment acting on the vehicle center of gravity due to the lateral force on the rear axle

[0149] 3504: M_(S)=−F_(S)*1SpV . . . moment acting on the vehicle center of gravity due to the lateral force on the front axle

[0150] 3505: wheel==VL OR wheel==HL . . . wheel is on left side

[0151] 3506: M_(L)=F_(L)*SW/2 . . . moment acting on the vehicle center of gravity due to right-side longitudinal force

[0152] 3507: M_(L)=−F_(L)*SW/2 . . . moment acting on the vehicle center of gravity due to left-side longitudinal force

[0153] 3508: M_(Sp)=M_(L)+M_(S) . . . moment component acting on the vehicle center of gravity due to this wheel

[0154] 3509: End

[0155] After the start of the program flow in step 3501, in step 3502 it is determined whether the wheel is on the front axle. If this is the case, in step 3504 the moment acting on the vehicle's center of gravity due to the lateral force on the front axle is computed. If this is not the case, in step 3503 the moment acting on the vehicle's center of gravity due to the lateral force on the rear axle is computed.

[0156] Subsequently, in step 3505, it is determined whether the wheel is on the left vehicle side. If this is the case, in step 3507 the moment acting on the vehicle's center of gravity due to a longitudinal force on the left side is determined. If this is not the case, in step 3506 the moment acting on the vehicle's center of gravity due to a longitudinal force on the right side is determined.

[0157] Subsequently, in step 3508, the moment component acting on the vehicle's center of gravity due to the wheel in question is determined by the addition of the moments determined in steps 3503 or 3504 and 3506 or 3507. In step 3509 the program flow is terminated.

[0158]FIG. 11 shows a flow chart explaining the computation of a moment acting on the vehicle's center of gravity by summation.

[0159] The meaning of the method steps shown in FIG. 11 is explained first.

[0160] 3510: Start

[0161] 3511: M_(yaw)=0.0 . . . default value for moment acting on the vehicle's center of gravity

[0162] 3512: F_(L)=F_(L)wheel_(VL)

[0163] F_(S)=F_(S)wheel_(VL) . . . front left

[0164] 3513: Call determination of moment about the vertical axis acting on the vehicle's center of gravity

[0165] 3514: M_(yaw)=M_(yaw)+M_(Sp) . . . yaw moment from adding up moments acting on the vehicle's center of gravity

[0166] 3515: F_(L)=F_(L)wheel_(VR)

[0167] F_(S)=F_(S)wheel_(VR) . . . front right

[0168] 3516: Call determination of moment about the vertical axis acting on the vehicle's center of gravity

[0169] 3517: M_(yaw)=M_(yaw)+M_(Sp) . . . yaw moment from adding up moments acting on the vehicle's center of gravity

[0170] 3518: F_(L=F) _(L)wheel_(HL)

[0171] F_(S)=F_(S)wheel_(HL) . . . rear left

[0172] 3519: Call determination of moment about the vertical axis acting on the vehicle's center of gravity

[0173] 3520: M_(yaw)=M_(yaw)+M_(Sp) . . . yaw moment from adding up moments acting on the vehicle's center of gravity

[0174] 3521: F_(L) F_(L)wheel_(HR)

[0175] F_(S)=F_(S)wheel_(HR) . . . rear right

[0176] 3522: Call determination of moment about the vertical axis acting on the vehicle's center of gravity

[0177] 3523: M_(yaw)=M_(yaw)+M_(Sp) . . . yaw moment from adding up moments acting on the vehicle's center of gravity

[0178] 3524: End

[0179] The summation of all wheels for determining the moment acting on the vehicle's center of gravity starts in step 3510. Subsequently, in step 3511, a default value for the moment acting on the center of gravity is determined. In step 3512, the longitudinal and lateral forces of the front left wheel are stored as variables to be processed further.

[0180] In step 3513, these are used in determining the moment about the vertical axis acting on the vehicle's center of gravity. In step 3514, the yaw moment is computed by adding up the moments acting on the vehicle's center of gravity.

[0181] In steps 3515 through 3517, the method explained with reference to steps 3512 through 3514 for the front left wheel is repeated for the front right wheel. Then the method is repeated in steps 3518 through 3520 for the rear left wheels. Following the computation for the rear left wheel, the method is performed in the same way for the rear right wheel in steps 3521 through 3523. In step 3524 the sequence is terminated.

[0182]FIG. 12 shows a flow chart explaining the computation of a moment acting on the vehicle's center of gravity by summation in the case of ESP longitudinal force intervention. First, the meaning of the method steps shown in FIG. 12 is explained again.

[0183] 3401: Start

[0184] 3402: M_(yaw)E_(Sp)=0.0 . . . default value for moment acting on the vehicle's center of gravity

[0185] 3403: F_(L)=F_(L)wheel_(VL)−ΔF_(LESP)wheel_(VL)

[0186] F_(S)=F_(S)wheel_(VL)−ΔF_(SESP)wheel_(VL) . . . front left

[0187] 3404: Call determination of moment about the vertical axis acting on the vehicle's center of gravity

[0188] 3405: M_(yaw)E_(SP)=M_(yaw)E_(SP)+M_(Sp) . . . yaw moment from adding up moments acting on the vehicle's center of gravity

[0189] 3406: F_(L)=F_(L)wheel_(VR)−ΔF_(LESP)wheel_(VR)

[0190] F_(S)=F_(S)wheel_(VR)−ΔF_(SESP)wheel_(VR) . . . front right

[0191] 3407: Call determination of moment about the vertical axis acting on the vehicle's center of gravity

[0192] 3408: M_(yaw)E_(SP)=M_(yaw)E_(SP)+M_(Sp) . . . yaw moment from adding up moments acting on the vehicle's center of gravity

[0193] 3409: F_(L)=F_(L)wheel_(HL)−ΔF_(LESP)wheel_(HL)

[0194] Fs=F_(S)wheel_(HL)−ΔF_(SESP)wheel_(HL) . . . rear left

[0195] 3410: Call determination of moment about the vertical axis acting on the vehicle's center of gravity

[0196] 3411: M_(yaw)E_(SP)=M_(yaw)E_(SP)+M_(Sp) . . . yaw moment from adding up moments acting on the vehicle's center of gravity

[0197] 3412: F_(L)=F_(L)wheel_(HR)−ΔF_(LESP)wheel_(HR)

[0198] F_(S)=F_(S)wheel_(HR)−ΔF_(SESP)wheel_(HR) . . . rear right

[0199] 3413: Call determination of moment about the vertical axis acting on the vehicle's center of gravity

[0200] 3414: M_(yaw)E_(SP)=M_(yaw)E_(SP)+M_(Sp) . . . yaw moment from adding up moments acting on the vehicle's center of gravity

[0201] 3415: End

[0202] The sequence starts in step 3401. In step 3402, the default value of zero is initially set for the moment acting on the vehicle's center of gravity. Subsequently, in step 3403, from the longitudinal wheel force on the front left wheel and the change in longitudinal force, determined for this wheel, a value is determined, which is stored as the variable for the longitudinal force. Furthermore, from the particular variables, the value of variable Fs is determined. In step 3404, the moment about the vertical axis acting on the vehicle's center of gravity is determined using the variables determined in step 3403. In step 3405, the yaw moment is computed by adding up the moments acting on the vehicle's center of gravity.

[0203] In steps 3406 through 3408, steps 3403 through 3405, which were executed there for the front left wheel, are executed for the front right wheel. Then, in steps 3409 through 3411, the method is executed for the rear left wheel. Finally, in steps 3412 through 3414, the method is executed for the rear right wheel. In step 3415 the sequence of this program flow is terminated.

[0204]FIG. 13 shows a flow chart explaining the computation of a moment acting on the vehicle's center of gravity by summation in the case of EAS lateral force intervention.

[0205] First, the meaning of the method steps shown in FIG. 13 is explained.

[0206] 3601: Start

[0207] 3602: M_(yaw)E_(AS)=0.0 . . . default value for the moment acting on the vehicle's center of gravity

[0208] 3603: F_(L)=F_(L)wheel_(VL)−ΔF_(LEAS)wheel_(VL)

[0209] F_(S)=F_(S)wheel_(VL)−ΔF_(SEAS)wheel_(VL) . . . front left

[0210] 3604: Call determination of moment about the vertical axis acting on the vehicle's center of gravity

[0211] 3605: M_(yaw)E_(AS)=M_(yaw)E_(AS)+M_(Sp) . . . yaw moment from adding up moments acting on the vehicle's center of gravity

[0212] 3606: F_(L)=F_(L)wheel_(VR)−ΔF_(LEAS)wheel_(VR)

[0213] F_(S)=F_(S)wheel_(VR)−ΔF_(SEAS)wheel_(VR) . . . front right

[0214] 3607: Call determination of moment about the vertical axis acting on the vehicle's center of gravity

[0215] 3608: M_(yaw)E_(AS)=M_(yaw)E_(AS)+M_(Sp) . . . yaw moment from adding up moments acting on the vehicle's center of gravity

[0216] 3609: F_(L)=F_(L)wheel_(HL)−ΔF_(LEAS)wheel_(HL)

[0217] F_(S)=F_(S)wheel_(HL)−ΔF_(S)E_(AS)wheel_(HL) . . . rear left

[0218] 3610: Call determination of moment about the vertical axis acting on the vehicle's center of gravity

[0219] 3611: M_(yaw)E_(AS)=M_(yaw)E_(AS)+M_(Sp) . . . yaw moment from adding up moments acting on the vehicle's center of gravity

[0220] 3612: F_(L)=F_(L)wheel_(HR)−ΔF_(LEAS)wheel_(HR)

[0221] F_(S)=F_(S)wheel_(HR)−ΔF_(SEAS)wheel_(HR) . . . rear right

[0222] 3613: Call determination of moment about the vertical axis acting on the vehicle's center of gravity

[0223] 3614: M_(yaw)E_(AS)=M_(yaw)E_(AS)+M_(Sp) . . . yaw moment from adding up moments acting on the vehicle's center of gravity

[0224] 3615: End

[0225] After the start of the routine in step 3601, in step 3602 a default value of zero is set for the moment acting on the vehicle's center of gravity. Then from the longitudinal force and the calculated change in longitudinal force, the longitudinal force used for determining the moment about the vertical axis acting on the vehicle's center of gravity is determined. In the same way, the lateral force is determined from the corresponding values. In step 3604, the determination of the moment about the vertical axis acting on the vehicle's center of gravity using the variables determined in step 3603 is called. In step 3605, the yaw moment is determined by adding up the moments acting on the vehicle's center of gravity.

[0226] In steps 3606 through 3608, the same method as explained in conjunction with steps 3603 through 3605 for the front left wheel, is executed for the front right wheel. Then, in steps 3609 through 3611, the method is executed for the rear left wheel. Finally, in steps 3612 through 3614, the method is executed for the rear right wheel. In step 3615 the sequence of this program flow is terminated.

[0227] At this point, it should be pointed out that the sequence of processing operations given above for the individual wheels may be modified.

[0228]FIG. 14 shows a flow chart for explaining the formation of intervention moments in ESP and EAS for an intervention evaluation. The change in moments due to the ESP and EAS interventions are considered stabilizing moments changing the longitudinal and transverse forces, respectively. At this point, other systems having the same effect but different interfaces may also be introduced. Since the formation of such an interface may be highly significant from the point of view of system engineering, this step is explicitly executed as such.

[0229] To form the intervention moment in the direction of the normal force, the computation steps explained in connection with FIG. 14 and discussed in connection with FIGS. 10 through 13 may be used as examples of the procedure for conclusively evaluating the effect of the interventions in the normal force distribution regarding the overall vehicle stability compared to systems which influence longitudinal and transverse forces. A signal M_(H) which describes the change in the yaw moment about the vehicle's vertical axis acting on the vehicle's center of gravity is expected as an interface signal, by analogy with M_(S) for the lateral force intervention and M_(L) for longitudinal force intervention.

[0230] The meaning of the method steps provided in FIG. 14 is explained first.

[0231] 3525: Start

[0232] 3526: M_(S)=M_(yaw)E_(AS)−M_(yaw) . . . yaw moment from EAS intervention minus working point

[0233] 3527: M_(L)=M_(yaw)E_(SP)−M_(yaw) . . . yaw moment from EAS [sic; ESP] intervention minus working point

[0234] 3528: End

[0235] After the start of the routine in step 3525, in step 3526 the interface signal for the lateral force intervention is computed as the yaw moment from the EAS intervention minus the working point regarding the lateral force. In a comparable manner, in step 3527, the interface signal for the longitudinal force intervention is computed by subtraction. In step 3528, this subprogram is terminated.

[0236]FIG. 15 shows a flow chart explaining the prioritization, evaluation, and selection of stabilizing interventions. Initially the selection of the maximum moment M_(SP)Max is explained. The possible interventions in the moment acting on the vehicle's center of gravity—normal force intervention, lateral force intervention, and longitudinal force intervention—are checked as follows:

[0237] a) moment due to normal force distribution

[0238] b) moment due to lateral force intervention

[0239] c) a)+b)

[0240] d) g)+a)

[0241] e) g)+b)

[0242] f) a)+b)+g)

[0243] g) moment due to longitudinal force intervention

[0244] The number of options is 2 ^(n−1), where n=3=number of intervention options. These options are played out in the sequence mentioned on the basis of a comparison of absolute values and compared with the required moment acting on the vehicle's center of gravity MspMax previously determined on the basis of a comparison of absolute values. If M_(SP)Max is achieved, the first intervention in this sequence is selected and allowed. The prioritization of interventions is thus predefined in the sequence of the above listing.

[0245] The vehicle is successfully stabilized in each case, if stabilization is requested and is possible, using these simple queries. It is conceivable, for example, that ESP cannot be activated, for example, due to a fault in an ABS valve; however, a required stabilizing moment (setpoint slip) is output by ESP. Its effect is then implemented, for example, by EAR by a normal force intervention and by EAS by a lateral force intervention.

[0246] It is also conceivable, for example, that the moment request by ESP is greater than that by EAR and EAS. Then the first one is selected as M_(SP)Max, but it is not put through, since the summation of moments due to normal and lateral force variation is sufficient to represent this moment.

[0247] It is also conceivable that a sum intervention is weaker and therefore possibly more comfortable than an individual intervention, for example, by bringing the tire forces into the downward sloping ranges of the characteristic curves. Therefore, to check combined interventions, longitudinal force intervention, known to be uncomfortable, is evaluated last by the brake system.

[0248] In this sequence of the computing steps it is assumed that the longitudinal force intervention means the least comfort and greatest loss of speed, and a chassis intervention to change the normal force distribution offers the greatest comfort. It is also assumed that an intervention into the steering system for building up lateral forces represents little loss of comfort for the driver.

[0249] The query for absolute values is performed at this point in order to compare interventions regardless or their plus or minus signs. The query is sufficient to permit the correct intervention. However, the prerequisite is that the interventions by the subsystems pursue the same objective; otherwise the overall effect is perceptibly non-homogeneous. For example, it is conceivable that at a certain instance a subsystem reduces the float angle of the vehicle to improve vehicle stability, for example, on the basis of float angle estimation algorithms. Another subsystem, however, performs yaw rate control against understeering tendencies almost at the same time. This might result in a combination of interventions which makes the influence on the vehicle rapidly and perceptibly go from plus to minus or vice-versa. In developing such composite systems, special attention must be paid to the fact that such interventions are perceptible and/or disturbing.

[0250] As an alternative to this algorithm, it would be conceivable to weight the effects of all interventions and, after examining all interventions, select the one that implements the required M_(SP)Max, but keeps the smallest possible distance to it. This would make a predefinition of priorities as done here dispensable. Instead, a priority would be computed in each cycle. However, this advantage is offset by higher computing costs.

[0251] Before explaining in detail the method illustrated in FIG. 15, the meaning of the method steps shown in FIG. 15 is explained.

[0252]FIG. 15a:

[0253] 3801: Start

[0254] 3802: M_(SP)Max :=0 . . . default value for required stabilizing moment

[0255] M_(a)):=M_(N) . . . moment from normal force intervention has 1 ^(st) priority for stabilization

[0256] M_(b)):=M_(S) . . . moment from lateral force intervention has 2^(nd) priority for stabilization

[0257] M_(C)):=M_(N)+M_(S) . . . moment from normal plus lateral force intervention has 3^(rd) priority

[0258] M_(d)):=M_(L)+M_(N) . . . moment from longitudinal plus normal force intervention has 4^(th) priority

[0259] M_(e)):=M_(L)+M_(S) . . . moment from longitudinal plus lateral force intervention has 5^(th) priority

[0260] M_(f)):=M_(L)+M_(S)+M_(N) . . . moment from longitudinal+lateral+normal force intervention has 6^(th) priority

[0261] M_(g)):=M_(L) . . . moment from longitudinal force intervention has 7^(th) priority for stabilization

[0262] 3803: InterventionNout=FALSE . . . intervention on normal force may take place

[0263] InterventionSout=FALSE . . . intervention on lateral force may take place

[0264] InterventionLout=FALSE . . . intervention on longitudinal force may take place

[0265] 3804: |M_(L)|>|M_(SP)Max| . . . stabilizing moment from longitudinal force intervention greater than required stabilizing moment

[0266] 3805: M_(SP)Max=M_(L) . . . moment from longitudinal force intervention [equal to] required stabilizing moment

[0267] 3806: |M_(N)|>|M_(SP)Max| . . . stabilizing moment from normal force intervention greater than required stabilizing moment

[0268] 3807: M_(SP)Max=M_(N) . . . moment from normal force intervention required stabilizing moment

[0269] 3808: |M_(S)|>|M_(SP)Max| . . . stabilizing moment from lateral force intervention greater than required stabilizing moment

[0270] 3809: M_(SP)Max=M_(S) . . . moment from lateral force intervention required stabilizing moment

[0271]FIG. 15b:

[0272] 3810: |M_(a))|<|M_(SP)Max| . . . absolute value of stabilizing moment from a) less than that of required stabilizing moment

[0273] 3811: InterventionLout=TRUE . . . longitudinal force intervention off

[0274] InterventionSout=TRUE . . . lateral force intervention off

[0275] 3812: |M_(b))|<|M_(SP)Max| . . . absolute value of stabilizing moment from b) less than that of required stabilizing moment

[0276] 3813: InterventionLout=TRUE . . . longitudinal force intervention off

[0277] InterventionNout=TRUE . . . normal force intervention off

[0278] 3814: |M_(C))|<|M_(SP)Max| . . . absolute value of stabilizing moment from c) less than that of required stabilizing moment

[0279] 3815: InterventionLout=TRUE . . . longitudinal force intervention off

[0280] 3816: |M_(d))|<|M_(SP)Max| . . . absolute value of stabilizing moment from d) less than that of required stabilizing moment

[0281] 3817: InterventionNout=TRUE . . . normal force intervention off

[0282] InterventionSout=TRUE . . . lateral force intervention off

[0283]FIG. 15c:

[0284] 3818: |M_(e))|<|M_(SP)Max| . . . absolute value of stabilizing moment from e) less than that of required stabilizing moment

[0285] 3819: InterventionSout=TRUE . . . lateral force intervention off

[0286] 3820: |M_(f))|<|M_(SP)Max| . . . absolute value of stabilizing moment from f) less than that of required stabilizing moment

[0287] 3821: InterventionNout=TRUE . . . normal force intervention off

[0288] 3822: End

[0289] The program flow starts in step 3801. Subsequently, in step 3802, moments are computed for further processing as a function of the priorities of the interventions. In step 3803, the output values which determine whether interventions may take place are established. Initially it is established that normal force intervention, lateral force intervention, and longitudinal force intervention may take place.

[0290] In step 3804 it is determined whether the stabilizing moment from the longitudinal force intervention is greater than the required stabilizing moment. If this is the case, the moment from the longitudinal force intervention is stored in step 3805 as the required stabilizing moment. Then the procedure continues with step 3806. If the query in step 3804 is answered with NO, the procedure still continues with step 3806.

[0291] In step 3806 it is determined whether the stabilizing moment from the normal force intervention is greater than a required stabilizing moment. If this is the case, the moment from the normal force intervention is stored in step 3807 as the required stabilizing moment. Then the procedure continues with step 3808. If the query in step 3806 is answered with NO, the procedure still continues with step 3808.

[0292] In step 3808 it is checked whether the stabilizing moment from the lateral force intervention is greater than the required stabilizing moment. If this is the case, the moment from the lateral force intervention is stored as the required stabilizing moment. Then the procedure continues with step 3810. If the query in step 3808 is answered with NO, the procedure still continues with step 3810.

[0293] In step 3810 it is checked whether the absolute value of stabilizing moment M_(a)) is less than that of the required stabilizing moment. If this is the case, both a longitudinal force intervention and a lateral force intervention are turned off in step 3811.

[0294] If the query in step 3810 is answered with YES, it is determined in step 3812 whether the absolute value of stabilizing moment M_(b)) is less than that of a required stabilizing moment. If this is not the case, a longitudinal force intervention and a normal force intervention are turned off.

[0295] If the query in step 3812 is answered with YES, it is determined in step 3814 whether the absolute value of stabilizing moment M_(c)) is less than that of the required stabilizing moment. If this is not the case, the longitudinal force intervention is turned off.

[0296] If the query in step 3814 is answered with YES, it is checked in subsequent step 3816 whether the absolute value of stabilizing moment M_(d)) is less than that of the required stabilizing moment. If this is not the case, normal force intervention and lateral force intervention are turned off.

[0297] If, however, the query in step 3816 is answered with YES, it is determined in step 3818 whether the absolute value of stabilizing moment M_(e)) is less than that of a required stabilizing moment. If this is not the case, the lateral force intervention is turned off.

[0298] If, however, the query in step 3818 is answered with YES, it is determined in step 3820 whether the absolute value of stabilizing moment M_(f)) is less than that of the required stabilizing moment. If this is not the case, the normal force intervention is turned off.

[0299] If the query of step 3820 is answered with YES, the procedure is terminated in step 3822. The procedure is also terminated after the particular intervention variables have been turned off in steps 3811, 3813, 3815, 3817, 3819, and 3821.

[0300] The preceding description of the exemplary embodiments according to the present invention is only used for illustrative purposes and not to limit the invention. Various changes and modifications are possible within the framework of the present invention without going beyond the scope of the present invention or its equivalents. 

What is claimed is:
 1. A system for monitoring the handling of a vehicle, comprising a plurality of individual systems (12, 14, 16) for influencing the handling of the vehicle, wherein a management device (10) is provided for managing the influence on the handling by the individual systems (12, 14, 16).
 2. The system as recited in claim 1, wherein ESP (12), EAS (14), EAR (16), and/or ABC can be provided as individual systems.
 3. The system as recited in claim 1 or 2, wherein the management device (10) is implemented in a control unit which communicates with control units of the individual systems via an interface (18, 28, 30).
 4. The system as recited in one of the preceding claims, wherein the management device (10) is implemented in a separate control unit.
 5. The system as recited in one of the preceding claims, wherein the management device (10) is implemented in one or more control unit(s) of the individual systems.
 6. The system as recited in one of the preceding claims, wherein setpoint values determined by the individual systems (12, 14, 16) and actual values are input into the management device (10); the potential effects of the individual systems (12, 14, 16) are determined from the input values; and the management device (10) can output values which influence the effects of individual systems (12, 14, 16).
 7. The system as recited in one of the preceding claims, wherein the management device (10) can suppress interventions by individual systems (12, 14, 16).
 8. A method for monitoring the handling of a vehicle, the handling of the vehicle being influenced by a plurality of individual systems (12, 14, 16), wherein a management device (10) is provided for managing the influence on the handling by the individual systems (12, 14, 16).
 9. The method as recited in claim 8, wherein ESP (12), EAS (14), EAR (16), and/or ABC may be provided as individual systems.
 10. The method as recited in claim 8 or 9, wherein the management device (10) is implemented in a control unit which communicates with control units of the individual systems via an interface (18, 28, 30).
 11. The method as recited in one of claims 8 through 10, wherein the management device (10) is implemented in a separate control unit.
 12. The method as recited in one of claims 8 through 11, wherein the management device (10) is implemented in one or more control unit(s) of the individual systems.
 13. The method as recited in one of claims 8 through 12, wherein setpoint values determined by the individual systems (12, 14, 16) and actual values are input into the management device (10); the potential effects of the individual systems (12, 14, 16) are determined from the input values; and the management device (10) can output values which influence the effects of individual systems (12, 14, 16).
 14. The method as recited in one of claims 8 through 13, wherein the management device (10) can suppress interventions by individual systems (12, 14, 16). 